Definitions with no quantifier alternation

Abstract

Let D(G) be the minimum quantifier depth of a first order sentence that defines a graph G up to isomorphism. Let D0(G) be the version of D(G) where we do not allow quantifier alternations in . Define q0(n) to be the minimum of D0(G) over all graphs G of order n. We prove that for all n we have *n-**n-1 q0(n) *n+22, where *n is equal to the minimum number of iterations of the binary logarithm needed to bring n to 1 or below. The upper bound is obtained by constructing special graphs with modular decomposition of very small depth.

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